Consider a circle `x^(2)+y^(2)+ax+by+c=0` lying completely in the first quadrant .If `m_(1)` and `m_(2)` are maximum and minimum values of `y//x` for all ordered pairs `(x,y)` on the circumference of the circle, then the value of `(m_(1)+m_(2))` is

Consider a circle x^2+y^2+a x+b y+c=0 lying completely in the first quadrant. If m_1a n dm_2 are the maximum and minimum values of y/x for all ordered pairs (x ,y) on the circumference of the circle, then the value of (m_1+m_2) is

Consider a circle x^2+y^2+a x+b y+c=0 lying completely in the first quadrant. If m_1a n dm_2 are the maximum and minimum values of y/x for all ordered pairs (x ,y) on the circumference of the circle, then the value of (m_1+m_2) is (a) (a^2-4c)/(b^2-4c) (b) (2a b)/(b^2-4c) (c) (2a b)/(4c-b^2) (d) (2a b)/(b^2-4a c)

Consider a circle x^2+y^2+a x+b y+c=0 lying completely in the first quadrant. If m_1a n dm_2 are the maximum and minimum values of y/x for all ordered pairs (x ,y) on the circumference of the circle, then the value of (m_1+m_2) is (a)(a^2-4c)/(b^2-4c) (b) (2a b)/(b^2-4c) (c)(2a b)/(4c-b^2) (d) (2a b)/(b^2-4a c)

Consider a circle x^2+y^2+a x+b y+c=0 lying completely in the first quadrant. If m_1a n dm_2 are the maximum and minimum values of y/x for all ordered pairs (x ,y) on the circumference of the circle, then the value of (m_1+m_2) is (a) (a^2-4c)/(b^2-4c) (b) (2a b)/(b^2-4c) (c) (2a b)/(4c-b^2) (d) (2a b)/(b^2-4a c)

If M and m are the maximum and minimum values of (y)/(x) for pair of real numbers (x, y) which satisfy the equation (x-3)^(2)+(y-3)^(2)=6 , then the value of (1)/(M)+(1)/(m) is

If M and m are the maximum and minimum values of (y)/(x) for pair of real numbers (x, y) which satisfy the equation (x-3)^(2)+(y-3)^(2)=6 , then the value of (1)/(M)+(1)/(m) is

If M and m are the maximum and minimum values of (y)/(x) for pair of real number (x,y) which satisfy the equation (x3)^(2)+(y-3)^(2)=6 then find the value of (M+m)

If f(x)=sin^(6)x+cos^(6)x and M_(1) and M_(2) be the maximum and minimum values of f(x) for all values of t then M_(1)-M_(2) is equal to

If circle x^(2)+y^(2)-x+3y+m=0 bisect the circumference of circle x^(2)+y^(2)-2x+2y+1=0 then value of m is

If the chord y=m x+1 of the circles x^2+y^2=1 subtends an angle of 45^0 at the major segment of the circle, then the value of m is